If `vecU=(-1,4)` and the resultant of `vecU and vecV` is (4, 5), find `vecV`.

Let vector vec(V)=(2,3) and vector vec(U)=(6,-4) . (i) What is the resultant of vecU and vecV ?

Assertion : An object has given two velocities vecv_(1) and vecv_(2) has a resultant velocity vecv = vecv_(1) + vecv_(2) . Reason : vecv_(1) and vecv_(2) should be velocities with reference to some common reference frame.

Let vecu,vecv,vecw be such that |vecu|=1,|vecv|=2,|vecw|3 . If the projection of vecv along vecu is equal to that of vecw along vecv,vecw are perpendicular to each other then |vecu-vecv+vecw| equals (A) 2 (B) sqrt(7) (C) sqrt(14) (D) 14

A unit vector perpendicular to vector vecV=(3,-4) is

Let vecu, vecv and vecw be such that |vecu|=1,|vecv|=2 and |vecw|=3 if the projection of vecv " along " vecu is equal to that of vecw along vecu and vectors vecv and vecw are perpendicular to each other then |vecu-vecv + vecw| equals

If vecV=2veci+3vecj and vecY=veci-5vecj , the resultant vector of 2vecU+3vecV equals

If veca and vecb are two non collinear vectors and vecu = veca-(veca.vecb).vecb and vecv=veca x vecb then vecv is

If the vectors veca and vecb are perpendicular to each other then a vector vecv in terms of veca and vecb satisfying the equations vecv.veca=0, vecv.vecb=1 and [(vecv, veca, vecb)]=1 is

Electrons having a velocity vecv of 2xx10^(6)ms^(-1) pass undeviated through a uniform electric field vecE of intensity 5xx10^(4)Vm^(-1) and a uniform magnetic field vecB . (i) Find the magnitude of magnetic flux density B of the magnetic field. (ii) What is the direction of vecB , if vecv is towards right and vecE is vertically downwards in the plane of this paper ?

If vecu and vecv be unit vectors. If vecw is a vector such that vecw+(vecwxxvecu)=vecv then vecu.(vecvxxvecw) will be equal to